Rhombitrihexagonal tiling

Deltoidal trihexagonal tiling
Deltoidal trihexagonal tiling
Type	Dual semiregular tiling
Faces	kite
Coxeter diagram
Symmetry group	p6m, [6,3], (*632)
Rotation group	p6, [6,3]+, (632)
Dual polyhedron	Rhombitrihexagonal tiling
Face configuration	V3.4.6.4
Properties	face-transitive

Rhombitrihexagonal tiling

Type	Semiregular tiling
Vertex configuration	3.4.6.4
Schläfli symbol	rr{6,3} or $r{\begin{Bmatrix}6\\3\end{Bmatrix}}$
Wythoff symbol	3 \| 6 2
Coxeter diagram
Symmetry	p6m, [6,3], (*632)
Rotation symmetry	p6, [6,3]⁺, (632)
Bowers acronym	Rothat
Dual	Deltoidal trihexagonal tiling
Properties	Vertex-transitive

In geometry, the rhombitrihexagonal tiling is a semiregular tiling of the Euclidean plane. There are one triangle, two squares, and one hexagon on each vertex. It has Schläfli symbol of rr{3,6}.

John Conway calls it a rhombihexadeltille.^[1] It can be considered a cantellated by Norman Johnson's terminology or an expanded hexagonal tiling by Alicia Boole Stott's operational language.

There are three regular and eight semiregular tilings in the plane.

Uniform colorings[edit]

There is only one uniform coloring in a rhombitrihexagonal tiling. (Naming the colors by indices around a vertex (3.4.6.4): 1232.)

With edge-colorings there is a half symmetry form (3*3) orbifold notation. The hexagons can be considered as truncated triangles, t{3} with two types of edges. It has Coxeter diagram , Schläfli symbol s₂{3,6}. The bicolored square can be distorted into isosceles trapezoids. In the limit, where the rectangles degenerate into edges, a triangular tiling results, constructed as a snub triangular tiling, .

Symmetry	[6,3], (*632)	[6,3⁺], (3*3)
Name	Rhombitrihexagonal	Cantic snub triangular		Snub triangular
Image	Uniform face coloring	Uniform edge coloring	Nonuniform geometry	Limit
Schläfli symbol	rr{3,6}	s₂{3,6}		s{3,6}
Coxeter diagram

Examples[edit]

From The Grammar of Ornament (1856)	The game Kensington	Floor tiling, Archeological Museum of Seville, Sevilla, Spain	The Temple of Diana in Nîmes, France	Roman floor mosaic in Castel di Guido

Related tilings[edit]

There is one related 2-uniform tiling, having hexagons dissected into six triangles.^[3]^[4] The rhombitrihexagonal tiling is also related to the truncated trihexagonal tiling by replacing some of the hexagons and surrounding squares and triangles with dodecagons:

1-uniform	2-uniform dissections
3.4.6.4	3.3.4.3.4 & 3⁶	to CH
Dual Tilings
3.4.6.4	4.6.12	to 3

Circle packing[edit]

The rhombitrihexagonal tiling can be used as a circle packing, placing equal diameter circles at the center of every point. Every circle is in contact with four other circles in the packing (kissing number).^[5] The translational lattice domain (red rhombus) contains six distinct circles.

Wythoff construction[edit]

There are eight uniform tilings that can be based from the regular hexagonal tiling (or the dual triangular tiling).

Drawing the tiles colored as red on the original faces, yellow at the original vertices, and blue along the original edges, there are eight forms, seven topologically distinct. (The truncated triangular tiling is topologically identical to the hexagonal tiling.)

Uniform hexagonal/triangular tilings v t e
Symmetry: [6,3], (*632)							[6,3]⁺ (632)	[6,3⁺] (3*3)
{6,3}	t{6,3}	r{6,3}	t{3,6}	{3,6}	rr{6,3}	tr{6,3}	sr{6,3}	s{3,6}


6³	3.12²	(3.6)²	6.6.6	3⁶	3.4.6.4	4.6.12	3.3.3.3.6	3.3.3.3.3.3
Uniform duals

V6³	V3.12²	V(3.6)²	V6³	V3⁶	V3.4.6.4	V.4.6.12	V3⁴.6	V3⁶

Symmetry mutations[edit]

This tiling is topologically related as a part of sequence of cantellated polyhedra with vertex figure (3.4.n.4), and continues as tilings of the hyperbolic plane. These vertex-transitive figures have (*n32) reflectional symmetry.

*n32 symmetry mutation of expanded tilings: 3.4.n.4
Symmetry *n32 [n,3]	Spherical				Euclid.	Compact hyperb.		Paracomp.
Symmetry *n32 [n,3]	*232 [2,3]	*332 [3,3]	*432 [4,3]	*532 [5,3]	*632 [6,3]	*732 [7,3]	*832 [8,3]...	*∞32 [∞,3]
Figure
Config.	3.4.2.4	3.4.3.4	3.4.4.4	3.4.5.4	3.4.6.4	3.4.7.4	3.4.8.4	3.4.∞.4

Deltoidal trihexagonal tiling[edit]

The deltoidal trihexagonal tiling is a dual of the semiregular tiling known as the rhombitrihexagonal tiling. Conway calls it a tetrille.^[1] The edges of this tiling can be formed by the intersection overlay of the regular triangular tiling and a hexagonal tiling. Each kite face of this tiling has angles 120°, 90°, 60° and 90°. It is one of only eight tilings of the plane in which every edge lies on a line of symmetry of the tiling.^[6]

The deltoidal trihexagonal tiling is a dual of the semiregular tiling rhombitrihexagonal tiling.^[7] Its faces are deltoids or kites.

Related polyhedra and tilings[edit]

It is one of seven dual uniform tilings in hexagonal symmetry, including the regular duals.

Dual uniform hexagonal/triangular tilings
Symmetry: [6,3], (*632)						[6,3]⁺, (632)

V6³	V3.12²	V(3.6)²	V3⁶	V3.4.6.4	V.4.6.12	V3⁴.6

This tiling has face transitive variations, that can distort the kites into bilateral trapezoids or more general quadrilaterals. Ignoring the face colors below, the fully symmetry is p6m, and the lower symmetry is p31m with three mirrors meeting at a point, and threefold rotation points.^[8]

Isohedral variations
Symmetry	p6m, [6,3], (*632)	p31m, [6,3⁺], (3*3)
Form
Faces	Kite	Half regular hexagon	Quadrilaterals

This tiling is related to the trihexagonal tiling by dividing the triangles and hexagons into central triangles and merging neighboring triangles into kites.

The deltoidal trihexagonal tiling is a part of a set of uniform dual tilings, corresponding to the dual of the rhombitrihexagonal tiling.

Symmetry mutations[edit]

This tiling is topologically related as a part of sequence of tilings with face configurations V3.4.n.4, and continues as tilings of the hyperbolic plane. These face-transitive figures have (*n32) reflectional symmetry.

*n32 symmetry mutation of dual expanded tilings: V3.4.n.4
Symmetry *n32 [n,3]	Spherical				Euclid.	Compact hyperb.		Paraco.
Symmetry *n32 [n,3]	*232 [2,3]	*332 [3,3]	*432 [4,3]	*532 [5,3]	*632 [6,3]	*732 [7,3]	*832 [8,3]...	*∞32 [∞,3]
Figure Config.	V3.4.2.4	V3.4.3.4	V3.4.4.4	V3.4.5.4	V3.4.6.4	V3.4.7.4	V3.4.8.4	V3.4.∞.4

Other deltoidal (kite) tiling[edit]

Other deltoidal tilings are possible.

Point symmetry allows the plane to be filled by growing kites, with the topology as a square tiling, V4.4.4.4, and can be created by crossing string of a dream catcher. Below is an example with dihedral hexagonal symmetry.

Another face transitive tiling with kite faces, also a topological variation of a square tiling and with face configuration V4.4.4.4. It is also vertex transitive, with every vertex containing all orientations of the kite face.


Symmetry	D₆, [6], (*66)	pmg, [∞,(2,∞)⁺], (22*)	p6m, [6,3], (*632)
Tiling
Configuration	V4.4.4.4		V6.4.3.4

Notes[edit]

^ ^a ^b Conway, 2008, p288 table
^ Ring Cycles a Jacks Chain variation
^ Chavey, D. (1989). "Tilings by Regular Polygons—II: A Catalog of Tilings". Computers & Mathematics with Applications. 17: 147–165. doi:10.1016/0898-1221(89)90156-9.
^ "Uniform Tilings". Archived from the original on 2006-09-09. Retrieved 2006-09-09.
^ Order in Space: A design source book, Keith Critchlow, p.74-75, pattern B
^ Kirby, Matthew; Umble, Ronald (2011), "Edge tessellations and stamp folding puzzles", Mathematics Magazine, 84 (4): 283–289, arXiv:0908.3257, doi:10.4169/math.mag.84.4.283, MR 2843659.
^ Weisstein, Eric W. "Dual tessellation". MathWorld. (See comparative overlay of this tiling and its dual)
^ Tilings and patterns

References[edit]

Grünbaum, Branko; Shephard, G. C. (1987). Tilings and Patterns. New York: W. H. Freeman. ISBN 0-7167-1193-1. (Chapter 2.1: Regular and uniform tilings, p. 58-65)
Williams, Robert (1979). The Geometrical Foundation of Natural Structure: A Source Book of Design. Dover Publications, Inc. ISBN 0-486-23729-X. p40
John H. Conway, Heidi Burgiel, Chaim Goodman-Strauss, The Symmetries of Things 2008, ISBN 978-1-56881-220-5 [1] (Chapter 21, Naming Archimedean and Catalan polyhedra and tilings.
Weisstein, Eric W. "Uniform tessellation". MathWorld.
Weisstein, Eric W. "Semiregular tessellation". MathWorld.
Klitzing, Richard. "2D Euclidean tilings x3o6x - rothat - O8".
Keith Critchlow, Order in Space: A design source book, 1970, p. 69-61, Pattern N, Dual p. 77-76, pattern 2
Dale Seymour and Jill Britton, Introduction to Tessellations, 1989, ISBN 978-0866514613, pp. 50–56, dual p. 116

[Conway,_2008,_p288_table-1] Conway, 2008, p288 table

[2] Ring Cycles a Jacks Chain variation

[3] Chavey, D. (1989). "Tilings by Regular Polygons—II: A Catalog of Tilings". Computers & Mathematics with Applications. 17: 147–165. doi:10.1016/0898-1221(89)90156-9.

[4] "Uniform Tilings". Archived from the original on 2006-09-09. Retrieved 2006-09-09.

[Critchlow-5] Order in Space: A design source book, Keith Critchlow, p.74-75, pattern B

[6] Kirby, Matthew; Umble, Ronald (2011), "Edge tessellations and stamp folding puzzles", Mathematics Magazine, 84 (4): 283–289, arXiv:0908.3257, doi:10.4169/math.mag.84.4.283, MR 2843659.

[7] Weisstein, Eric W. "Dual tessellation". MathWorld. (See comparative overlay of this tiling and its dual)

[8] Tilings and patterns

[1]

[2]

[3]

[4]

[5]

[6]

[7]

[8]

Uniform colorings[edit]

Examples[edit]

Related tilings[edit]

Circle packing[edit]

Wythoff construction[edit]

Symmetry mutations[edit]

Deltoidal trihexagonal tiling[edit]

Related polyhedra and tilings[edit]

Symmetry mutations[edit]

Other deltoidal (kite) tiling[edit]

See also[edit]

Notes[edit]

References[edit]